HP 48gII User Manual

Page 16-31

A general expression for c

n

The function FOURIER can provide a general expression for the coefficient c

n

of the complex Fourier series expansion. For example, using the same
function g(t) as before, the general term c

n

is given by (figures show normal

font and small font displays):

The general expression turns out to be, after simplifying the previous result,

π

π

π

π

π

π

in

in

n

e

n

i

n

n

i

e

i

n

c

2

3

3

2

2

2

2

2

2

3

2

)

2

(

⋅

−

+

+

⋅

+

=

We can simplify this expression even further by using Euler’s formula for
complex numbers, namely, e

2in

π

= cos(2n

π) + i⋅sin(2nπ) = 1 + i⋅0 = 1, since

cos(2n

π) = 1, and sin(2nπ) = 0, for n integer.

Using the calculator you can simplify the expression in the equation writer
(

‚O) by replacing e

2in

π

= 1. The figure shows the expression after

simplification:

The result is c

n

= (i

⋅n⋅π+2)/(n

2

⋅π

2

).

Putting together the complex Fourier series
Having determined the general expression for c

n

, we can put together a finite

complex Fourier series by using the summation function (

Σ) in the calculator as

follows: